AbstractThis is a continuation of our note (J. Algebra186(1996), 120–131). We generalize and present simplified proofs almost all elementary lemmas from Section 8 of the Odd Order Paper. In many places we use Hall's enumeration principle and other simple combinatorial arguments. A number of related results are proved as well. Some open questions are posed
The thesis centres around two problems in the enumeration of p-groups. Define fφ(pm) to be the numb...
AbstractIn this expository paper we collect some combinatorial problems in the additive theory that ...
AbstractFor certain properties P of groups, by using earlier characterizing results of G. Pazderski,...
AbstractThis is a continuation of our note (J. Algebra186(1996), 120–131). We generalize and present...
Abelian subgroups play a key role in the theory and applications of nite p-groups. Our purpose is to...
AbstractSuppose p is a prime, P is a finite p-group, and A is an abelian subgroup of P. Does P posse...
Abstract: In this paper, I show that if p is an odd prime, and if P is a finite p-group, then there ...
AbstractIt is well known that if an elementary abelian p-group P acts on a p′-group Q and Q=[Q,P], t...
Let G be a finite p-group where p is an odd prime. We say that <? has property A n if every abeli...
Given a finite group G, we denote by ? \u27(G) the product of element orders of G. Our main result p...
Let G be a group,p aprime number andV a faithful Fr[G]-module, where $ is a field ofp elements. Call...
The thesis centres around two problems in the enumeration of p-groups. Define fφ(pm) to be the numb...
AbstractLet S=(α1, …, α2p−1) be a sequence of 2p−1 elements of an Abelian group G of type (p, p). Th...
Abstract. Suppose A is an abelian torsion group with a subgroup G such that A/G is countable that is...
We show that the number of maximal abelian subgroups of a finite p-group is congruent to 1 modulo p....
The thesis centres around two problems in the enumeration of p-groups. Define fφ(pm) to be the numb...
AbstractIn this expository paper we collect some combinatorial problems in the additive theory that ...
AbstractFor certain properties P of groups, by using earlier characterizing results of G. Pazderski,...
AbstractThis is a continuation of our note (J. Algebra186(1996), 120–131). We generalize and present...
Abelian subgroups play a key role in the theory and applications of nite p-groups. Our purpose is to...
AbstractSuppose p is a prime, P is a finite p-group, and A is an abelian subgroup of P. Does P posse...
Abstract: In this paper, I show that if p is an odd prime, and if P is a finite p-group, then there ...
AbstractIt is well known that if an elementary abelian p-group P acts on a p′-group Q and Q=[Q,P], t...
Let G be a finite p-group where p is an odd prime. We say that <? has property A n if every abeli...
Given a finite group G, we denote by ? \u27(G) the product of element orders of G. Our main result p...
Let G be a group,p aprime number andV a faithful Fr[G]-module, where $ is a field ofp elements. Call...
The thesis centres around two problems in the enumeration of p-groups. Define fφ(pm) to be the numb...
AbstractLet S=(α1, …, α2p−1) be a sequence of 2p−1 elements of an Abelian group G of type (p, p). Th...
Abstract. Suppose A is an abelian torsion group with a subgroup G such that A/G is countable that is...
We show that the number of maximal abelian subgroups of a finite p-group is congruent to 1 modulo p....
The thesis centres around two problems in the enumeration of p-groups. Define fφ(pm) to be the numb...
AbstractIn this expository paper we collect some combinatorial problems in the additive theory that ...
AbstractFor certain properties P of groups, by using earlier characterizing results of G. Pazderski,...
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